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Quantum Error Correction a tutorial A.M. Steane Oxford University

Learn about quantum error correction and how to hide qubits from noise in the ground state. Explore classical error correcting codes and their minimum distance for efficient communication.

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Quantum Error Correction a tutorial A.M. Steane Oxford University

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  1. Quantum Error Correction • a tutorial • A.M. Steane • Oxford University

  2. Hiding qubits from the noise y y ground state throw away exact!

  3. Classical information theory

  4. The simple repetition idea can achieve good quality (i.e. low noise) communication, but it makes inefficient use of the bits. • To do better, we look in detail at how bit flips affect bit strings.

  5. Classical Error Correcting Codes 110 111 100 010 011 000 001 A code is also a group under addition

  6. Example: • G=1010101 H = 1010101 • 0110011 0110011 • 0001111 0001111 • 1111111 • C = 0000000, 1010101, 0110011, 1100110, • 0001111, 1011010, 0111100, 1101001 • 7 bits, 23 = 8 members, minimum weight 4 Minimum distance d) correct up to (d-1)/2 errors. For a linear code, the minimum distance between members is also the minimum weight.

  7. Dual codes Some codes contain their duals.

  8. Quasi-classical code

  9. }  correct } • “correction” results in

  10.  to pdf

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